| // Copyright 2017 The Abseil Authors. |
| // |
| // Licensed under the Apache License, Version 2.0 (the "License"); |
| // you may not use this file except in compliance with the License. |
| // You may obtain a copy of the License at |
| // |
| // https://www.apache.org/licenses/LICENSE-2.0 |
| // |
| // Unless required by applicable law or agreed to in writing, software |
| // distributed under the License is distributed on an "AS IS" BASIS, |
| // WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied. |
| // See the License for the specific language governing permissions and |
| // limitations under the License. |
| |
| #include "absl/random/exponential_distribution.h" |
| |
| #include <algorithm> |
| #include <cfloat> |
| #include <cmath> |
| #include <cstddef> |
| #include <cstdint> |
| #include <iterator> |
| #include <limits> |
| #include <random> |
| #include <sstream> |
| #include <string> |
| #include <type_traits> |
| #include <vector> |
| |
| #include "gmock/gmock.h" |
| #include "gtest/gtest.h" |
| #include "absl/base/internal/raw_logging.h" |
| #include "absl/base/macros.h" |
| #include "absl/numeric/internal/representation.h" |
| #include "absl/random/internal/chi_square.h" |
| #include "absl/random/internal/distribution_test_util.h" |
| #include "absl/random/internal/pcg_engine.h" |
| #include "absl/random/internal/sequence_urbg.h" |
| #include "absl/random/random.h" |
| #include "absl/strings/str_cat.h" |
| #include "absl/strings/str_format.h" |
| #include "absl/strings/str_replace.h" |
| #include "absl/strings/strip.h" |
| |
| namespace { |
| |
| using absl::random_internal::kChiSquared; |
| |
| template <typename RealType> |
| class ExponentialDistributionTypedTest : public ::testing::Test {}; |
| |
| // double-double arithmetic is not supported well by either GCC or Clang; see |
| // https://gcc.gnu.org/bugzilla/show_bug.cgi?id=99048, |
| // https://bugs.llvm.org/show_bug.cgi?id=49131, and |
| // https://bugs.llvm.org/show_bug.cgi?id=49132. Don't bother running these tests |
| // with double doubles until compiler support is better. |
| using RealTypes = |
| std::conditional<absl::numeric_internal::IsDoubleDouble(), |
| ::testing::Types<float, double>, |
| ::testing::Types<float, double, long double>>::type; |
| TYPED_TEST_SUITE(ExponentialDistributionTypedTest, RealTypes); |
| |
| TYPED_TEST(ExponentialDistributionTypedTest, SerializeTest) { |
| using param_type = |
| typename absl::exponential_distribution<TypeParam>::param_type; |
| |
| const TypeParam kParams[] = { |
| // Cases around 1. |
| 1, // |
| std::nextafter(TypeParam(1), TypeParam(0)), // 1 - epsilon |
| std::nextafter(TypeParam(1), TypeParam(2)), // 1 + epsilon |
| // Typical cases. |
| TypeParam(1e-8), TypeParam(1e-4), TypeParam(1), TypeParam(2), |
| TypeParam(1e4), TypeParam(1e8), TypeParam(1e20), TypeParam(2.5), |
| // Boundary cases. |
| std::numeric_limits<TypeParam>::max(), |
| std::numeric_limits<TypeParam>::epsilon(), |
| std::nextafter(std::numeric_limits<TypeParam>::min(), |
| TypeParam(1)), // min + epsilon |
| std::numeric_limits<TypeParam>::min(), // smallest normal |
| // There are some errors dealing with denorms on apple platforms. |
| std::numeric_limits<TypeParam>::denorm_min(), // smallest denorm |
| std::numeric_limits<TypeParam>::min() / 2, // denorm |
| std::nextafter(std::numeric_limits<TypeParam>::min(), |
| TypeParam(0)), // denorm_max |
| }; |
| |
| constexpr int kCount = 1000; |
| absl::InsecureBitGen gen; |
| |
| for (const TypeParam lambda : kParams) { |
| // Some values may be invalid; skip those. |
| if (!std::isfinite(lambda)) continue; |
| ABSL_ASSERT(lambda > 0); |
| |
| const param_type param(lambda); |
| |
| absl::exponential_distribution<TypeParam> before(lambda); |
| EXPECT_EQ(before.lambda(), param.lambda()); |
| |
| { |
| absl::exponential_distribution<TypeParam> via_param(param); |
| EXPECT_EQ(via_param, before); |
| EXPECT_EQ(via_param.param(), before.param()); |
| } |
| |
| // Smoke test. |
| auto sample_min = before.max(); |
| auto sample_max = before.min(); |
| for (int i = 0; i < kCount; i++) { |
| auto sample = before(gen); |
| EXPECT_GE(sample, before.min()) << before; |
| EXPECT_LE(sample, before.max()) << before; |
| if (sample > sample_max) sample_max = sample; |
| if (sample < sample_min) sample_min = sample; |
| } |
| if (!std::is_same<TypeParam, long double>::value) { |
| ABSL_INTERNAL_LOG(INFO, |
| absl::StrFormat("Range {%f}: %f, %f, lambda=%f", lambda, |
| sample_min, sample_max, lambda)); |
| } |
| |
| std::stringstream ss; |
| ss << before; |
| |
| if (!std::isfinite(lambda)) { |
| // Streams do not deserialize inf/nan correctly. |
| continue; |
| } |
| // Validate stream serialization. |
| absl::exponential_distribution<TypeParam> after(34.56f); |
| |
| EXPECT_NE(before.lambda(), after.lambda()); |
| EXPECT_NE(before.param(), after.param()); |
| EXPECT_NE(before, after); |
| |
| ss >> after; |
| |
| EXPECT_EQ(before.lambda(), after.lambda()) // |
| << ss.str() << " " // |
| << (ss.good() ? "good " : "") // |
| << (ss.bad() ? "bad " : "") // |
| << (ss.eof() ? "eof " : "") // |
| << (ss.fail() ? "fail " : ""); |
| } |
| } |
| |
| // http://www.itl.nist.gov/div898/handbook/eda/section3/eda3667.htm |
| |
| class ExponentialModel { |
| public: |
| explicit ExponentialModel(double lambda) |
| : lambda_(lambda), beta_(1.0 / lambda) {} |
| |
| double lambda() const { return lambda_; } |
| |
| double mean() const { return beta_; } |
| double variance() const { return beta_ * beta_; } |
| double stddev() const { return std::sqrt(variance()); } |
| double skew() const { return 2; } |
| double kurtosis() const { return 6.0; } |
| |
| double CDF(double x) { return 1.0 - std::exp(-lambda_ * x); } |
| |
| // The inverse CDF, or PercentPoint function of the distribution |
| double InverseCDF(double p) { |
| ABSL_ASSERT(p >= 0.0); |
| ABSL_ASSERT(p < 1.0); |
| return -beta_ * std::log(1.0 - p); |
| } |
| |
| private: |
| const double lambda_; |
| const double beta_; |
| }; |
| |
| struct Param { |
| double lambda; |
| double p_fail; |
| int trials; |
| }; |
| |
| class ExponentialDistributionTests : public testing::TestWithParam<Param>, |
| public ExponentialModel { |
| public: |
| ExponentialDistributionTests() : ExponentialModel(GetParam().lambda) {} |
| |
| // SingleZTest provides a basic z-squared test of the mean vs. expected |
| // mean for data generated by the poisson distribution. |
| template <typename D> |
| bool SingleZTest(const double p, const size_t samples); |
| |
| // SingleChiSquaredTest provides a basic chi-squared test of the normal |
| // distribution. |
| template <typename D> |
| double SingleChiSquaredTest(); |
| |
| // We use a fixed bit generator for distribution accuracy tests. This allows |
| // these tests to be deterministic, while still testing the qualify of the |
| // implementation. |
| absl::random_internal::pcg64_2018_engine rng_{0x2B7E151628AED2A6}; |
| }; |
| |
| template <typename D> |
| bool ExponentialDistributionTests::SingleZTest(const double p, |
| const size_t samples) { |
| D dis(lambda()); |
| |
| std::vector<double> data; |
| data.reserve(samples); |
| for (size_t i = 0; i < samples; i++) { |
| const double x = dis(rng_); |
| data.push_back(x); |
| } |
| |
| const auto m = absl::random_internal::ComputeDistributionMoments(data); |
| const double max_err = absl::random_internal::MaxErrorTolerance(p); |
| const double z = absl::random_internal::ZScore(mean(), m); |
| const bool pass = absl::random_internal::Near("z", z, 0.0, max_err); |
| |
| if (!pass) { |
| ABSL_INTERNAL_LOG( |
| INFO, absl::StrFormat("p=%f max_err=%f\n" |
| " lambda=%f\n" |
| " mean=%f vs. %f\n" |
| " stddev=%f vs. %f\n" |
| " skewness=%f vs. %f\n" |
| " kurtosis=%f vs. %f\n" |
| " z=%f vs. 0", |
| p, max_err, lambda(), m.mean, mean(), |
| std::sqrt(m.variance), stddev(), m.skewness, |
| skew(), m.kurtosis, kurtosis(), z)); |
| } |
| return pass; |
| } |
| |
| template <typename D> |
| double ExponentialDistributionTests::SingleChiSquaredTest() { |
| const size_t kSamples = 10000; |
| const int kBuckets = 50; |
| |
| // The InverseCDF is the percent point function of the distribution, and can |
| // be used to assign buckets roughly uniformly. |
| std::vector<double> cutoffs; |
| const double kInc = 1.0 / static_cast<double>(kBuckets); |
| for (double p = kInc; p < 1.0; p += kInc) { |
| cutoffs.push_back(InverseCDF(p)); |
| } |
| if (cutoffs.back() != std::numeric_limits<double>::infinity()) { |
| cutoffs.push_back(std::numeric_limits<double>::infinity()); |
| } |
| |
| D dis(lambda()); |
| |
| std::vector<int32_t> counts(cutoffs.size(), 0); |
| for (int j = 0; j < kSamples; j++) { |
| const double x = dis(rng_); |
| auto it = std::upper_bound(cutoffs.begin(), cutoffs.end(), x); |
| counts[std::distance(cutoffs.begin(), it)]++; |
| } |
| |
| // Null-hypothesis is that the distribution is exponentially distributed |
| // with the provided lambda (not estimated from the data). |
| const int dof = static_cast<int>(counts.size()) - 1; |
| |
| // Our threshold for logging is 1-in-50. |
| const double threshold = absl::random_internal::ChiSquareValue(dof, 0.98); |
| |
| const double expected = |
| static_cast<double>(kSamples) / static_cast<double>(counts.size()); |
| |
| double chi_square = absl::random_internal::ChiSquareWithExpected( |
| std::begin(counts), std::end(counts), expected); |
| double p = absl::random_internal::ChiSquarePValue(chi_square, dof); |
| |
| if (chi_square > threshold) { |
| for (int i = 0; i < cutoffs.size(); i++) { |
| ABSL_INTERNAL_LOG( |
| INFO, absl::StrFormat("%d : (%f) = %d", i, cutoffs[i], counts[i])); |
| } |
| |
| ABSL_INTERNAL_LOG(INFO, |
| absl::StrCat("lambda ", lambda(), "\n", // |
| " expected ", expected, "\n", // |
| kChiSquared, " ", chi_square, " (", p, ")\n", |
| kChiSquared, " @ 0.98 = ", threshold)); |
| } |
| return p; |
| } |
| |
| TEST_P(ExponentialDistributionTests, ZTest) { |
| const size_t kSamples = 10000; |
| const auto& param = GetParam(); |
| const int expected_failures = |
| std::max(1, static_cast<int>(std::ceil(param.trials * param.p_fail))); |
| const double p = absl::random_internal::RequiredSuccessProbability( |
| param.p_fail, param.trials); |
| |
| int failures = 0; |
| for (int i = 0; i < param.trials; i++) { |
| failures += SingleZTest<absl::exponential_distribution<double>>(p, kSamples) |
| ? 0 |
| : 1; |
| } |
| EXPECT_LE(failures, expected_failures); |
| } |
| |
| TEST_P(ExponentialDistributionTests, ChiSquaredTest) { |
| const int kTrials = 20; |
| int failures = 0; |
| |
| for (int i = 0; i < kTrials; i++) { |
| double p_value = |
| SingleChiSquaredTest<absl::exponential_distribution<double>>(); |
| if (p_value < 0.005) { // 1/200 |
| failures++; |
| } |
| } |
| |
| // There is a 0.10% chance of producing at least one failure, so raise the |
| // failure threshold high enough to allow for a flake rate < 10,000. |
| EXPECT_LE(failures, 4); |
| } |
| |
| std::vector<Param> GenParams() { |
| return { |
| Param{1.0, 0.02, 100}, |
| Param{2.5, 0.02, 100}, |
| Param{10, 0.02, 100}, |
| // large |
| Param{1e4, 0.02, 100}, |
| Param{1e9, 0.02, 100}, |
| // small |
| Param{0.1, 0.02, 100}, |
| Param{1e-3, 0.02, 100}, |
| Param{1e-5, 0.02, 100}, |
| }; |
| } |
| |
| std::string ParamName(const ::testing::TestParamInfo<Param>& info) { |
| const auto& p = info.param; |
| std::string name = absl::StrCat("lambda_", absl::SixDigits(p.lambda)); |
| return absl::StrReplaceAll(name, {{"+", "_"}, {"-", "_"}, {".", "_"}}); |
| } |
| |
| INSTANTIATE_TEST_SUITE_P(All, ExponentialDistributionTests, |
| ::testing::ValuesIn(GenParams()), ParamName); |
| |
| // NOTE: absl::exponential_distribution is not guaranteed to be stable. |
| TEST(ExponentialDistributionTest, StabilityTest) { |
| // absl::exponential_distribution stability relies on std::log1p and |
| // absl::uniform_real_distribution. |
| absl::random_internal::sequence_urbg urbg( |
| {0x0003eb76f6f7f755ull, 0xFFCEA50FDB2F953Bull, 0xC332DDEFBE6C5AA5ull, |
| 0x6558218568AB9702ull, 0x2AEF7DAD5B6E2F84ull, 0x1521B62829076170ull, |
| 0xECDD4775619F1510ull, 0x13CCA830EB61BD96ull, 0x0334FE1EAA0363CFull, |
| 0xB5735C904C70A239ull, 0xD59E9E0BCBAADE14ull, 0xEECC86BC60622CA7ull}); |
| |
| std::vector<int> output(14); |
| |
| { |
| absl::exponential_distribution<double> dist; |
| std::generate(std::begin(output), std::end(output), |
| [&] { return static_cast<int>(10000.0 * dist(urbg)); }); |
| |
| EXPECT_EQ(14, urbg.invocations()); |
| EXPECT_THAT(output, |
| testing::ElementsAre(0, 71913, 14375, 5039, 1835, 861, 25936, |
| 804, 126, 12337, 17984, 27002, 0, 71913)); |
| } |
| |
| urbg.reset(); |
| { |
| absl::exponential_distribution<float> dist; |
| std::generate(std::begin(output), std::end(output), |
| [&] { return static_cast<int>(10000.0f * dist(urbg)); }); |
| |
| EXPECT_EQ(14, urbg.invocations()); |
| EXPECT_THAT(output, |
| testing::ElementsAre(0, 71913, 14375, 5039, 1835, 861, 25936, |
| 804, 126, 12337, 17984, 27002, 0, 71913)); |
| } |
| } |
| |
| TEST(ExponentialDistributionTest, AlgorithmBounds) { |
| // Relies on absl::uniform_real_distribution, so some of these comments |
| // reference that. |
| |
| #if (defined(__i386__) || defined(_M_IX86)) && FLT_EVAL_METHOD != 0 |
| // We're using an x87-compatible FPU, and intermediate operations can be |
| // performed with 80-bit floats. This produces slightly different results from |
| // what we expect below. |
| GTEST_SKIP() |
| << "Skipping the test because we detected x87 floating-point semantics"; |
| #endif |
| |
| absl::exponential_distribution<double> dist; |
| |
| { |
| // This returns the smallest value >0 from absl::uniform_real_distribution. |
| absl::random_internal::sequence_urbg urbg({0x0000000000000001ull}); |
| double a = dist(urbg); |
| EXPECT_EQ(a, 5.42101086242752217004e-20); |
| } |
| |
| { |
| // This returns a value very near 0.5 from absl::uniform_real_distribution. |
| absl::random_internal::sequence_urbg urbg({0x7fffffffffffffefull}); |
| double a = dist(urbg); |
| EXPECT_EQ(a, 0.693147180559945175204); |
| } |
| |
| { |
| // This returns the largest value <1 from absl::uniform_real_distribution. |
| // WolframAlpha: ~39.1439465808987766283058547296341915292187253 |
| absl::random_internal::sequence_urbg urbg({0xFFFFFFFFFFFFFFeFull}); |
| double a = dist(urbg); |
| EXPECT_EQ(a, 36.7368005696771007251); |
| } |
| { |
| // This *ALSO* returns the largest value <1. |
| absl::random_internal::sequence_urbg urbg({0xFFFFFFFFFFFFFFFFull}); |
| double a = dist(urbg); |
| EXPECT_EQ(a, 36.7368005696771007251); |
| } |
| } |
| |
| } // namespace |
